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Welcome to Physics 12. Ms Ritcey. Plan:. Course outline, expectations, about me, etc. Joke of the day/clip of the day Review: SF Precision Error Accuracy. Joke of the day/clip of the day:. Fans of the Big Bang Theory???? http://www.youtube.com/watch?v=JtL5q1IACfo. Measurement.
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Welcome to Physics 12 Ms Ritcey
Plan: • Course outline, expectations, about me, etc. • Joke of the day/clip of the day • Review: • SF • Precision • Error • Accuracy
Joke of the day/clip of the day: • Fans of the Big Bang Theory???? • http://www.youtube.com/watch?v=JtL5q1IACfo
Measurement • When taking measurements, it is important to note that no measurement can be taken exactly • Therefore, each measurement has an estimate contained in the measurement as the final digit • When taking a measurement, the final digit is an estimate and an error estimate should be included
Least Count • When using a measuring device (non-digital) the least count should be determined • The least count is the smallest division that appears on the device (i.e. for a metre stick, it would usually be mm) • When taking a measurement, the digits should be recorded one place past the least count • i.e. for a metre stick, a recording should be to tenths of mm
Digital Devices • Digital devices make the error estimate for you so you will simply record the digits presented on the device • The device should also include an error estimate in the manual or on the label of the device
Error Estimate • The error estimate should be for the final digit in a measurement and is commonly ±5 • For a meter stick, a measurement would be recorded as 1.5743 ±.0005m
Significant Figures • Because all numbers in science are based upon a measurement, the estimates contained in the numbers must be accounted for • Could 1+1=3? • While conventional wisdom tells us this is not true, from a science standpoint it could be: • 1.4+1.4=2.8
Significant Figures • It is therefore important to know when a digit is significant • A digit is significant if: • It is non-zero (i.e. 4246 4SF’s) • A zero is between two non-zeros (i.e. 40003 5SF’s) • A zero is to the right of the decimal and to the right of a non-zero (i.e. 4.00 3SF’s or 0.00210 3SF’s) • All digits in scientific notation (i.e. 3.57x103 3SF’s)
Significant Figures • The rule that we will use for mathematical operations and significant figures is: • Consider all values used in a calculation; the one with the fewest significant figures will determine the number of significant figures in your answer
Page 942 (3, 4, 5a, 5b, 6) • 3, 2, 3, 2, 3, 1, 3, 7, 1, 2, 4, 4 • 1.2, 2.3, 5.9, 6.9, 6.3, 4.5, 5.5, 10. • 9.7, 290 • 2.5597x100, 1x103, 2.56x10-1, 5.08x10-5
Precision and Accuracy • Precision – describes the exactness and repeatability of a value or set of values. A set of data could be grouped very tightly, demonstrating good precision but not necessarily accuracy • Accuracy – describes the degree to which the result of an experiment or calculation approximates the true value.
Random Error Small variations due to randomly changing conditions Repeating trials will reduce but never eliminate Unbiased Affects precision Systematic Error Results from consistent bias in observation Repeating trials will not reduce Three types: natural, instrument calibration and personal Affects accuracy Error • There are two types of error that need to be considered following data collection in an experiment.
Error Analysis • There are two main calculations that we will use to analyse error in an experiment • Percent Difference • Measures precision • Percent Deviation • Measures accuracy
To do : • Page 939 • 1-5